Group actions on simple tracially Z-absorbing C*-algebras

Abstract

We show that if A is a simple (not necessarily unital) tracially Z-absorbing C*-algebra and α G Aut (A) is an action of a finite group G on A with the weak tracial Rokhlin property, then the crossed product C*(G, A,α) and the fixed point algebra Aα are simple and tracially Z-absorbing, and they are Z-stable if, in addition, A is separable and nuclear. The same conclusion holds for all intermediate C*-algebras of the inclusions Aα ⊂eq A and A ⊂eq C*(G, A,α). We prove that if A is a simple tracially Z-absorbing C*-algebra, then, under a finiteness condition, the permutation action of the symmetric group Sm on the minimal m-fold tensor product of A has the weak tracial Rokhlin property. We define the weak tracial Rokhlin property for automorphisms of simple C*-algebras and we show that -- under a mild assumption -- (tracial) Z-absorption is preserved under crossed products by such automorphisms.